Chromatic Vertex Folkman Numbers

Abstract

For graph G and integers a1 ·s ar 2, we write G → (a1 ,·s ,ar)v if and only if for every r-coloring of the vertex set V(G) there exists a monochromatic Kai in G for some color i ∈ \1, ·s, r\. The vertex Folkman number Fv(a1 ,·s ,ar; s) is defined as the smallest integer n for which there exists a Ks-free graph G of order n such that G → (a1 ,·s ,ar)v. It is well known that if G → (a1 ,·s ,ar)v then (G) ≥ m, where m = 1+ Σi=1r (ai - 1). In this paper we study such Folkman graphs G with chromatic number (G)=m, which leads to a new concept of chromatic Folkman numbers. We prove constructively some existential results, among others that for all r,s 2 there exist Ks+1-free graphs G such that G → (s,·sr,s)v and G has the smallest possible chromatic number r(s-1)+1 for this r-color arrowing to hold. We also conjecture that, in some cases, our construction is the best possible, in particular that for every s 2 there exists a Ks+1-free graph G on Fv(s,s; s+1) vertices with (G)=2s-1 such that G → (s,s)v.